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Main Authors: Bhowmik, Bishnu, Mitra, Sayantan, Ziff, Robert M., Sensharma, Ankur
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2509.09999
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author Bhowmik, Bishnu
Mitra, Sayantan
Ziff, Robert M.
Sensharma, Ankur
author_facet Bhowmik, Bishnu
Mitra, Sayantan
Ziff, Robert M.
Sensharma, Ankur
contents This article presents a Monte Carlo study on bond percolation in distorted square and triangular lattices. The distorted lattices are generated by dislocating the sites from their regular positions. The amount and direction of the dislocations are random, but can be tuned by the distortion parameter $α$. Once the sites are dislocated, the bond lengths $δ$ between the nearest neighbors change. A bond can only be occupied if its bond length is less than a threshold value called the connection threshold $d$. It is observed that when the connection threshold is greater than the lattice constant (assumed to be $1$), the bond percolation threshold $p_\mathrm{b}$ always increases with distortion. For $d\le 1$, no spanning configuration is found for the square lattice when the lattice is distorted, even very slightly. On the other hand, the triangular lattice not only spans for $d\le 1$, it also shows a decreasing trend for $p_\mathrm{b}$ in the low-$α$ range. These variation patterns have been linked with the average coordination numbers of the distorted lattices. A critical value $d_\mathrm{c}$ for the connection threshold has been defined as the value of $d$ below which no spanning configuration can be found even after occupying all the bonds satisfying the connection criterion $δ\le d$. The behavior of $d_\mathrm{c}(α)$ is markedly different for the two lattices.
format Preprint
id arxiv_https___arxiv_org_abs_2509_09999
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Bond percolation in distorted square and triangular lattices
Bhowmik, Bishnu
Mitra, Sayantan
Ziff, Robert M.
Sensharma, Ankur
Statistical Mechanics
This article presents a Monte Carlo study on bond percolation in distorted square and triangular lattices. The distorted lattices are generated by dislocating the sites from their regular positions. The amount and direction of the dislocations are random, but can be tuned by the distortion parameter $α$. Once the sites are dislocated, the bond lengths $δ$ between the nearest neighbors change. A bond can only be occupied if its bond length is less than a threshold value called the connection threshold $d$. It is observed that when the connection threshold is greater than the lattice constant (assumed to be $1$), the bond percolation threshold $p_\mathrm{b}$ always increases with distortion. For $d\le 1$, no spanning configuration is found for the square lattice when the lattice is distorted, even very slightly. On the other hand, the triangular lattice not only spans for $d\le 1$, it also shows a decreasing trend for $p_\mathrm{b}$ in the low-$α$ range. These variation patterns have been linked with the average coordination numbers of the distorted lattices. A critical value $d_\mathrm{c}$ for the connection threshold has been defined as the value of $d$ below which no spanning configuration can be found even after occupying all the bonds satisfying the connection criterion $δ\le d$. The behavior of $d_\mathrm{c}(α)$ is markedly different for the two lattices.
title Bond percolation in distorted square and triangular lattices
topic Statistical Mechanics
url https://arxiv.org/abs/2509.09999